Minimal surfaces in spheres and a Ricci-like condition
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Publication:2664583
DOI10.1007/s00229-020-01254-7zbMath1485.53081arXiv1912.12715OpenAlexW3101556269MaRDI QIDQ2664583
Theodoros Vlachos, Amalia-Sofia Tsouri
Publication date: 17 November 2021
Published in: Manuscripta Mathematica (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1912.12715
Minimal surfaces in differential geometry, surfaces with prescribed mean curvature (53A10) Differential geometry of immersions (minimal, prescribed curvature, tight, etc.) (53C42)
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Isometric deformations of pseudoholomorphic curves in the nearly Kähler sphere \(\mathbb{S}^6\) ⋮ Special Liouville metric with the Ricci condition
Cites Work
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- Exceptional minimal surfaces in spheres
- Submanifolds and special structures on the octonians
- The associated family of an elliptic surface and an application to minimal submanifolds
- The fundamental equations of minimal surfaces in \({\mathbb{C}}P^ 2\)
- An intrinsic characterization of a class of minimal surfaces in constant curvature manifolds
- Minimal surfaces, Hopf differentials and the Ricci condition
- Real Kaehler submanifolds and uniqueness of the Gauss map
- Branch points of conformal mappings of surfaces
- Generic minimal surfaces
- On minimal immersions of \(R^2\) into \(S^n\)
- Minimal surfaces in a sphere and the Ricci condition
- New examples of minimal Lagrangian tori in the complex projective plane
- \(J\)-holomorphic curves of a 6-dimensional sphere
- Totally real minimal tori in \(\mathbb CP^2\)
- Congruence of minimal surfaces and higher fundamental forms
- Characterizing a class of totally real submanifolds of \(S^ 6\) by their sectional curvatures
- Lagrangian Bonnet Problems in complex space forms
- Hamiltonian stationary Lagrangian surfaces in \(\mathbb C \mathbb{P}^{2}\)
- Examples of Hamiltonian stationary Lagrangian tori in \(\mathbb CP^2\)
- Complete minimal surfaces in \(S^ 3\)
- Minimal submanifolds with m-index 2 and generalized Veronese surfaces
- Holomorphic approximation and hyperfunction theory on a C\(^1\) totally real submanifold of a complex manifold
- Some intrinsic characterizations of minimal surfaces
- Minimal Surfaces by Moving Frames
- The family of isometric superconformal harmonic maps and the affine Toda equations.
- Minimal Surfaces with the Ricci Condition in 4-Dimensional Space Forms
- ON ALMOST COMPLEX CURVES IN THE NEARLY KÄHLER 6-SPHERE
- On Totally Real Submanifolds
- Rigidity of superconformal minimal surfaces lying fully in odd-dimensional unit spheres
- Lagrangian Bonnet pairs in $\mathbb CP^2$
- A class of austere submanifolds
- Isometric deformations of isotropic surfaces
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